1) resonance potential
谐振电势
2) harmonic oscillator potential
谐振子势
1.
In this paper,the approximate calculation approach of the Franck-Condon overlaps integrals in the electronic vibronic spectra of polyatomic molecule is investigated with the second-order perturbation theory and the harmonic oscillator potential.
本文利用非简并态的二级微扰理论,研究了谐振子势下多原子分子电子光谱中Franck-Condon重叠积分的计算方法,得到了单振动模Franck-Condon重叠积分的二级近似下的解析表达式,该表达式计算过程简单,并与精确计算结果进行了比较,表明近似结果在较大的振动量子数范围内具有很高的准确度。
3) harmonic trap
谐振势阱
1.
A solution to the ground and single vortex states of Bose-condensed gas in an axially symmetric harmonic trap;
轴对称谐振势阱中玻色凝聚气体基态和单涡旋态解
2.
Solution of the ground state wave function of Bose-condensed gas in a harmonic trap based on the Gross-Pitaevskii function;
基于Gross-Pitaevskii能量泛函求解谐振势阱中玻色凝聚气体基态波函数
3.
This paper studied a one-dimensional nonlinear Schrodinger equation and described a Bose-Einstein condensation with G-P function and variation in a three-dimensional axisymmetrical harmonic trap and a one-dimensional optical lattice.
对捕陷在三维轴对称谐振势阱叠加一维光晶格的组合势中的玻色凝聚气体,基于平均场G ross-P itae-vsk ii方程理论,并运用G-P能量泛函和变分方法,得出了非线性薛定谔方程的一维形式,运用数值计算的方法,研究了组合势中子凝聚体的粒子数分布与光晶格深度之间的关系,同时分析了磁势阱对子凝聚体粒子数分布的影响。
4) harmonic potential
谐振子势
1.
According to the analysis of wave function, we can find that harmonic potential is a good model to describe quantum dots.
根据对波函数的分析发现 ,谐振子势是描述量子点的一个较好的势模型。
2.
potential,which is the surperposition potential of the Corlomb potential and the harmonic potential in three dimensions, and discuss the degeneracy of its energy livil.
势即库仑势和三维谐振子势的迭加势的Schrodinger方程的解析解,并讨论了其能级简并度。
3.
potential, which is the superposition potential of the Coulomb potential, the harmonic potentialin three dimensions and the linear potential, and points out the characteristics of the potential and its solutions.
势(即库仑势、三维谐振子势和线性势的叠加势)的Schr(?)dinger方程的解析解,并讨论了C。
5) harmonic potential
谐振势
1.
Numerical calculation of finite Bose-Einstein condensation in harmonic potentials;
谐振势阱中有限粒子玻色—爱因斯坦凝聚的数值计算
2.
The critical temperature and the ground state fraction of weakly interacting Bose Einstein condensation in a harmonic potential trap are calculated with numerical method.
应用数值计算的方法计算了谐振势阱中有弱相互作用的玻色气体凝聚的临界温度和基态占据率。
6) Non resonance's interreactional potential energy
非谐振势能
补充资料:谐振子
谐振子
oscillator, harmonic
[补注1 [A正1 Arnol‘d,V 1.,Mathe皿t:cal卿th。〔15 of classlcal rnCch翻cs,Spnnger,1978(译自俄文). 【AZ 1 Seh湃L .1.,Quantum毗chanies,McGraw一Hill, 1949、杜小杨译谐振子〔蝴锐场叙丫,har~;oe““朋:rop,r叩Mo““-”ec心“1 一个单自由度系统,其振动由方程 无+田Zx二0来描述.相轨道是圆,振动的周期T=2兀/o,与振幅无关.谐振子的位能依赖于x的平方: 。2叉2 U之立竺‘竺-, 一, 谐振子的一些例子是:摆的微小振动,固定在刚性不变的弹簧上的质点的振动,最简单的电子振荡电路.“谐振子”和“线性振子”常常作为同义词使用. 量子力学线性振子的振动由阳诚戏吃er方程(Sellr6dinger eq娜戒lon) h,d,沙」「_m。,Zx,1。 一三二一二六答口十}E一二兴井一.{少“O 2小dx‘L一2」了来描述.其中m是质点的质量,E是它的能量,h是Planck常数,。是频率.量子力学线性振子具有能级离散谱:E。=(n+l/2)h。,n=0,1,2,…;相应的本征函数可以由Her而te函数(Her而te fimction)来表示. “振子”这一术语适用于其运动带有振动特性的具有有限个自由度的(力学或物理)系统(例如,vdn derPol振子—表示处于位势为坐标的正定二次型的位势力场中的质点的振动的多维线性振子,见van妞Fbl方程(van der Pol equation)).对于“振子”甚至“线性振子”,显然都没有唯一的解释.
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